#projection.x projection.y projection.z knotoid_type polynomial PD_code 0.831980953 -0.177698604 0.525576731 k0.1 + 1 PD[]; -0.339736512 0.0339474985 0.939907799 k0.1 + 1 PD[]; 0.777330987 -0.608988353 -0.157764769 k0.1 + 1 PD[]; 0.656961016 -0.721005513 0.220348074 k0.1 + 1 PD[]; -0.551542365 0.803144856 -0.225298378 k0.1 + 1 PD[]; 0.225665295 0.968468917 -0.105561029 k0.1 + 1 PD[]; 0.381947579 0.713648854 -0.587214917 k0.1 + 1 PD[]; 0.563503832 -0.133443332 -0.815264564 k0.1 + 1 PD[]; -0.100058239 -0.786135741 -0.609900767 k0.1 + 1 PD[]; 0.543131044 -0.0242091892 0.839298864 k0.1 + 1 PD[]; -0.325096733 -0.698946177 -0.637013623 k3.2m + A^(-2) + 1 - A^(2) - A^(4) + A^(8) PD[X[0,4,1,5],X[3,1,4,2],X[5,3,6,2]]; -0.349040705 -0.936982113 0.0153331561 k0.1 + 1 PD[]; 0.826618175 0.336218643 -0.451286402 k0.1 + 1 PD[]; 0.226133241 -0.249784108 0.941526238 k0.1 + 1 PD[]; 0.797787448 -0.383732735 0.465063842 k0.1 + 1 PD[]; -0.759954489 -0.425723359 0.491150483 k0.1 + 1 PD[]; -0.0458921752 0.526273489 -0.849076041 k0.1 + 1 PD[]; 0.869974873 0.202127578 0.449764563 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[2,1,3,0],X[1,4,2,3]]; 0.578650155 -0.28509078 0.76412515 k0.1 + 1 PD[]; 0.0671655028 -0.256837261 0.964117948 k0.1 + 1 PD[]; 0.132426132 -0.930362106 -0.341891315 k0.1 + 1 PD[]; 0.122787886 -0.552938906 0.824124809 k0.1 + 1 PD[]; -0.728091387 -0.113975449 -0.675938259 k0.1 + 1 PD[]; -0.722905633 0.240978646 0.64756215 k0.1 + 1 PD[]; -0.183727805 0.893665356 0.409397516 k0.1 + 1 PD[]; -0.808479333 -0.483854112 0.335031888 k0.1 + 1 PD[]; -0.882955219 0.430210166 -0.187907672 k0.1 + 1 PD[]; -0.437439342 -0.861488408 -0.257845971 k0.1 + 1 PD[]; -0.895082383 -0.400528509 0.19597051 k0.1 + 1 PD[]; -0.472878806 -0.872221032 -0.124964421 k0.1 + 1 PD[]; 0.419068315 0.495540028 0.76080341 k0.1 + 1 PD[]; 0.9869002 -0.110436418 0.117608645 k0.1 + 1 PD[]; -0.034150373 -0.655970287 -0.75401375 k0.1 + 1 PD[]; 0.755942527 -0.646957968 -0.0999814165 k0.1 + 1 PD[]; 0.853126842 0.18339756 0.488405494 k0.1 + 1 PD[]; -0.0928620356 -0.986557432 0.13446589 k0.1 + 1 PD[]; 0.551545028 -0.735228134 0.394002124 k0.1 + 1 PD[]; -0.448153382 -0.888094757 0.102206891 k0.1 + 1 PD[]; 0.578269151 0.356912195 -0.733633746 k0.1 + 1 PD[]; 0.909078978 0.412061653 0.061486627 k0.1 + 1 PD[]; -0.509507967 0.293017809 0.809037821 k0.1 + 1 PD[X[2,0,3,1],X[3,2,4,1]]; -0.759856508 0.493609069 -0.423046303 k0.1 + 1 PD[]; -0.22684871 -0.18002065 0.957147966 k0.1 + 1 PD[]; -0.463563024 0.864545157 -0.194090172 k0.1 + 1 PD[]; -0.881054301 -0.0240337838 -0.472404166 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[0,3,1,2],X[3,2,4,1]]; -0.0836977638 0.983946337 -0.157620719 k0.1 + 1 PD[]; -0.550686332 -0.659883091 -0.511174011 k0.1 + 1 PD[]; 0.924127887 -0.206062132 0.321754636 k0.1 + 1 PD[]; -0.46020749 0.231905842 0.856988183 k0.1 + 1 PD[]; 0.266192675 0.746558802 -0.609747008 k0.1 + 1 PD[]; 0.286648319 -0.766991935 0.574069781 k0.1 + 1 PD[]; 0.257293606 -0.873013592 0.414303353 k0.1 + 1 PD[]; -0.729550392 -0.678816472 0.0834531174 k0.1 + 1 PD[]; 0.589928605 0.585024771 0.556534149 k0.1 + 1 PD[]; 0.672524173 -0.732597145 -0.104941218 k0.1 + 1 PD[]; 0.664372682 -0.661633527 0.347634888 k0.1 + 1 PD[]; 0.996784483 -0.0723371471 -0.0344678205 k0.1 + 1 PD[]; 0.0126144548 -0.97143747 -0.236960162 k0.1 + 1 PD[]; -0.530043918 -0.117351319 0.83981076 k0.1 + 1 PD[]; -0.929146544 -0.0445598598 0.36701651 k0.1 + 1 PD[]; 0.493541076 -0.813533652 -0.307538945 k0.1 + 1 PD[]; 0.375943628 0.0536942689 -0.925085571 k0.1 + 1 PD[]; 0.416638266 -0.428700808 0.801640925 k0.1 + 1 PD[]; -0.125583337 -0.985517768 0.113945403 k0.1 + 1 PD[]; -0.18692284 -0.435630783 0.880503079 k0.1 + 1 PD[]; 0.294125253 -0.201586876 0.934266058 k0.1 + 1 PD[]; 0.46916729 -0.865070035 -0.177583472 k0.1 + 1 PD[]; 0.022673096 0.846517637 0.531877636 k0.1 + 1 PD[]; -0.773944836 0.239381048 0.586264535 k0.1 + 1 PD[]; 0.683170365 0.659196678 -0.314226021 k0.1 + 1 PD[]; 0.575559741 0.3151759 -0.754582757 k0.1 + 1 PD[]; -0.1094614 0.804635332 -0.583592481 k0.1 + 1 PD[]; -0.205496228 -0.856214334 -0.473991893 k0.1 + 1 PD[]; -0.529612752 0.823056465 -0.205154547 k0.1 + 1 PD[]; -0.169513766 0.875211855 -0.453066543 k0.1 + 1 PD[]; -0.294852166 -0.32999162 0.896753997 k0.1 + 1 PD[]; 0.269755094 0.935315771 -0.228946715 k0.1 + 1 PD[]; 0.863044711 -0.1443328 -0.484068042 k0.1 + 1 PD[]; -0.995698871 -0.0901996397 -0.0211608717 k0.1 + 1 PD[]; 0.0975619837 -0.281916626 -0.954465649 k0.1 + 1 PD[]; 0.199867634 0.788723488 -0.581350315 k0.1 + 1 PD[]; 0.498661266 -0.610693931 0.615134022 k0.1 + 1 PD[]; 0.959744588 0.0612893535 0.274105711 k0.1 + 1 PD[]; 0.629517264 0.538423553 0.560185766 k0.1 + 1 PD[]; 0.741361252 -0.664349535 -0.0949904709 k0.1 + 1 PD[]; 0.299648708 0.759442179 0.577458421 k0.1 + 1 PD[]; -0.158721239 -0.971723976 -0.174814421 k0.1 + 1 PD[]; 0.0431243949 0.967212696 0.250279617 k0.1 + 1 PD[]; -0.708658399 0.397282045 -0.583069678 k0.1 + 1 PD[]; 0.202754814 0.82070676 0.534163739 k0.1 + 1 PD[]; 0.147901617 0.897274662 -0.415960687 k0.1 + 1 PD[]; 0.874151195 0.270140159 -0.403588878 k0.1 + 1 PD[]; -0.897233962 0.429122137 -0.10404522 k0.1 + 1 PD[]; 0.10781 -0.812299057 0.57319041 k0.1 + 1 PD[]; 0.366587088 -0.756190733 0.542023507 k0.1 + 1 PD[]; -0.987056492 0.135928728 -0.0851050103 k0.1 + 1 PD[]; -0.0217971107 -0.378568301 -0.925316663 k0.1 + 1 PD[]; -0.278737923 -0.940229915 -0.195634551 k0.1 + 1 PD[]; -0.669329769 0.71268352 -0.209952046 k0.1 + 1 PD[]; 0.367898686 0.925816949 -0.086680647 k0.1 + 1 PD[];